Randomized Atomic Feature Models for Physics-Informed Identification of Dynamic Systems

TL;DR

This paper introduces a physics-informed system identification method using randomized atomic features, enabling scalable, interpretable modeling of dynamic systems with stability and modal constraints.

Contribution

It generalizes random Fourier and Laplace features to damped, nonstationary systems, providing a convex optimization framework with theoretical guarantees and practical advantages.

Findings

The approach retains modal interpretability and scalability.

Numerical results show improved impulse-response recovery with physical priors.

Theoretical analysis includes kernel positivity, convergence, and sparse recovery guarantees.

Abstract

We present a physics-informed framework for system identification based on randomized stable atomic features. Impulse responses are represented as random superpositions of stable atoms, namely damped complex exponentials associated with poles sampled inside a prescribed disk. Identification is then cast as a convex regularized least-squares problem with optional linear, second-order-cone, and KYP constraints. The approach generalizes random Fourier and random Laplace features to the damped, nonstationary regime relevant to engineering systems while retaining modal interpretability and scalable finite-dimensional computation. The main analytic point is an operator-theoretic Disk-Bochner viewpoint: positive measures over stable poles generate positive-definite kernels with a radius-dependent shift defect, while a converse scalar disk moment representation for an arbitrary kernel is characterized by subnormality of the canonical shift. We prove this statement, establish an RKHS-to-l1 embedding, show that sampled poles induce a valid finite atomic gauge, discuss random-feature convergence, and state sparse-recovery guarantees conditionally on the restricted-eigenvalue properties of the realized disk-Vandermonde or input-output design matrix. We also connect the normalized transfer function problem to Nevanlinna-Pick interpolation and LFT set-membership. The framework directly encodes stability margins, modal localization, DC-gain bounds, monotonicity, passivity, relative degree, settling-time targets, and time/frequency-domain error bounds. Numerical comparisons illustrate how physically meaningful priors can compensate for poor excitation and improve constrained impulse-response recovery in an under-informative data setting.